On K F-subnormality and submodularity in a finite group

Abstract

Let F be a formation and let G be a group. A subgroup H of G is K F-subnormal (submodular) in G if there is a subgroup chain H=H0 \ H1 \ … Hi ≤ Hi+1 … \ Hn=G such that for every i either Hi is normal in Hi+1 or Hi+1F Hi (Hi is a modular subgroup of Hi+1, respectively). We prove that a primary subgroup R of a group G is submodular in G if and only if R is K U1-subnormal in G. Here U1 is the class of all supersolvable groups of square-free exponent. In addition, for a solvable subgroup-closed formation F, every solvable KF-subnormal subgroup of a group G is contained in the solvable radical of G.